The aim of this paper is to prove that, for every balanced digraph, in every incidence semiring over a semifield, each centroid set J of the largest distance also has the largest weight, and the distance of J is equal to its weight. This result is surprising and unexpected, because examples show that distances of arbitrary centroid sets in incidence semirings may be strictly less than their weights. The investigation of the distances of centroid sets in incidence semirings of digraphs has been motivated by the information security applications of centroid sets
Abstract. The concept of distance is one of the basic concepts in Mathematics. How far two objects (...
Thesis: Ph. D., Massachusetts Institute of Technology, Department of Mathematics, 2019Cataloged from...
AbstractA semisymmetric design is a connected incidence structure satisfying; two points (blocks) ar...
The aim of this paper is to prove that, for every balanced digraph, in every incidence semiring over...
This paper is devoted to a combinatorial problem for incidence semirings, which can be viewed as set...
We consider the incidence semirings of graphs and prove that every incidence semiring has convenient...
We consider the incidence semirings of graphs and prove that every incidence semiring has convenient...
Our main results show that Munn semirings over idempotent semifields possess more convenient proper...
We introduce a new construction based on directed graphs. It provides a common generalization of the...
Recent research has motivated the investigation of the weights of ideals in semiring constructions b...
The main theorem of this paper gives a formula for the largest minimum distance of error-correcting ...
This article continues the investigation of matrix constructions motivated by their applications to ...
Let G=(V,E) be a graph, and w:V→Q>0 be a positive weight function on the vertices of G. For every su...
Discrete partially ordered sets can be turned into distance spaces in several ways. The distance fun...
AbstractWe show that the set of vertices in a tree T of smallest weight balance is the (branch weigh...
Abstract. The concept of distance is one of the basic concepts in Mathematics. How far two objects (...
Thesis: Ph. D., Massachusetts Institute of Technology, Department of Mathematics, 2019Cataloged from...
AbstractA semisymmetric design is a connected incidence structure satisfying; two points (blocks) ar...
The aim of this paper is to prove that, for every balanced digraph, in every incidence semiring over...
This paper is devoted to a combinatorial problem for incidence semirings, which can be viewed as set...
We consider the incidence semirings of graphs and prove that every incidence semiring has convenient...
We consider the incidence semirings of graphs and prove that every incidence semiring has convenient...
Our main results show that Munn semirings over idempotent semifields possess more convenient proper...
We introduce a new construction based on directed graphs. It provides a common generalization of the...
Recent research has motivated the investigation of the weights of ideals in semiring constructions b...
The main theorem of this paper gives a formula for the largest minimum distance of error-correcting ...
This article continues the investigation of matrix constructions motivated by their applications to ...
Let G=(V,E) be a graph, and w:V→Q>0 be a positive weight function on the vertices of G. For every su...
Discrete partially ordered sets can be turned into distance spaces in several ways. The distance fun...
AbstractWe show that the set of vertices in a tree T of smallest weight balance is the (branch weigh...
Abstract. The concept of distance is one of the basic concepts in Mathematics. How far two objects (...
Thesis: Ph. D., Massachusetts Institute of Technology, Department of Mathematics, 2019Cataloged from...
AbstractA semisymmetric design is a connected incidence structure satisfying; two points (blocks) ar...